The problem of thermal conduction for two ellipsoidal inhomogeneities in an anisotropic medium and its relevance to composite materials
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[1] Hatta Hiroshi,et al. Equivalent inclusion method for steady state heat conduction in composites , 1986 .
[2] M. Taya,et al. On effective moduli of an elastic body containing periodically distributed voids , 1981 .
[3] Toshio Mura,et al. Two-Ellipsoidal Inhomogeneities by the Equivalent Inclusion Method , 1975 .
[4] M. Taya,et al. On effective moduli of an elastic body containing periodically distributed voids: comments and corrections , 1985 .
[5] R. Hill. Elastic properties of reinforced solids: some theoretical principles , 1963 .
[6] L. Walpole. A rotated rigid ellipsoidal inclusion in an elastic medium , 1991, Proceedings of the Royal Society of London. Series A: Mathematical and Physical Sciences.
[7] Sia Nemat-Nasser,et al. On composites with periodic structure , 1982 .
[8] Joseph B. Keller,et al. Effective elasticity tensor of a periodic composite , 1984 .
[9] P. Marcal,et al. Introduction to the Finite-Element Method , 1973 .
[11] Mark Kachanov,et al. A simple technique of stress analysis in elastic solids with many cracks , 1985, International Journal of Fracture.
[12] W. Johnson,et al. Advanced engineering mathematics: E. Kreyszig John Wiley. 856 pp., 79s , 1963 .
[13] George Herrmann,et al. On two circular inclusions in harmonic problems , 1992 .
[14] Minoru Taya,et al. Effective thermal conductivity of a misoriented short fiber composite , 1985 .
[15] G. Rodin. The overall elastic response of materials containing spherical inhomogeneities , 1993 .
[16] Andreas Acrivos,et al. The solution of the equations of linear elasticity for an infinite region containing two spherical inclusions , 1978 .
[17] J. Nye. Physical Properties of Crystals: Their Representation by Tensors and Matrices , 1957 .
[18] Wolfgang Reisig. Properties of Systems , 1985 .
[19] T. Iwakuma,et al. Composites with periodic microstructure , 1983 .
[20] Gregory J. Rodin,et al. On the problem of linear elasticity for an infinite region containing a finite number of non-intersecting spherical inhomogeneities , 1991 .
[21] A. Sangani,et al. Elastic coefficients of composites containing spherical inclusions in a periodic array , 1987 .
[22] Eugene L. Grant,et al. Statistical Quality Control , 1946 .
[23] Tungyang Chen. An invariant treatment of interfacial discontinuities in piezoelectric media , 1993 .
[24] R. Cook,et al. Concepts and Applications of Finite Element Analysis , 1974 .
[25] F. W. Kellaway,et al. Advanced Engineering Mathematics , 1969, The Mathematical Gazette.
[26] M. Berveiller,et al. Multiple site self consistent scheme , 1989 .
[27] S. Shtrikman,et al. A Variational Approach to the Theory of the Effective Magnetic Permeability of Multiphase Materials , 1962 .
[28] M. Berveiller,et al. The problem of two plastic and heterogeneous inclusions in an anisotropic medium , 1987 .
[29] Alain Pagès,et al. System Reliability , 1986 .
[30] Toshio Mura,et al. Micromechanics of defects in solids , 1982 .
[31] J. D. Eshelby. The determination of the elastic field of an ellipsoidal inclusion, and related problems , 1957, Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences.
[32] R. Arridge. The thermal expansion and bulk modulus of composites consisting of arrays of spherical particles in a matrix, with body- or face-centred cubic symmetry , 1992, Proceedings of the Royal Society of London. Series A: Mathematical and Physical Sciences.